mirror of
https://github.com/pezkuwichain/pezkuwi-subxt.git
synced 2026-05-30 01:11:04 +00:00
Guillaume Thiolliere
447 lines
13 KiB
Rust
447 lines
13 KiB
Rust
// This file is part of Substrate.
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// Copyright (C) 2017-2021 Parity Technologies (UK) Ltd.
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// SPDX-License-Identifier: Apache-2.0
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// Licensed under the Apache License, Version 2.0 (the "License");
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// you may not use this file except in compliance with the License.
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// You may obtain a copy of the License at
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//
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// http://www.apache.org/licenses/LICENSE-2.0
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//
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// Unless required by applicable law or agreed to in writing, software
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// distributed under the License is distributed on an "AS IS" BASIS,
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// WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
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// See the License for the specific language governing permissions and
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// limitations under the License.
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//! Proc macro to generate the reward curve functions and tests.
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mod log;
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use log::log2;
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use proc_macro::TokenStream;
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use proc_macro2::{TokenStream as TokenStream2, Span};
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use proc_macro_crate::crate_name;
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use quote::{quote, ToTokens};
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use std::convert::TryInto;
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use syn::parse::{Parse, ParseStream};
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/// Accepts a number of expressions to create a instance of PiecewiseLinear which represents the
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/// NPoS curve (as detailed
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/// [here](https://research.web3.foundation/en/latest/polkadot/Token%20Economics.html#inflation-model))
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/// for those parameters. Parameters are:
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/// - `min_inflation`: the minimal amount to be rewarded between validators, expressed as a fraction
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/// of total issuance. Known as `I_0` in the literature.
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/// Expressed in millionth, must be between 0 and 1_000_000.
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///
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/// - `max_inflation`: the maximum amount to be rewarded between validators, expressed as a fraction
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/// of total issuance. This is attained only when `ideal_stake` is achieved.
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/// Expressed in millionth, must be between min_inflation and 1_000_000.
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///
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/// - `ideal_stake`: the fraction of total issued tokens that should be actively staked behind
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/// validators. Known as `x_ideal` in the literature.
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/// Expressed in millionth, must be between 0_100_000 and 0_900_000.
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///
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/// - `falloff`: Known as `decay_rate` in the literature. A co-efficient dictating the strength of
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/// the global incentivization to get the `ideal_stake`. A higher number results in less typical
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/// inflation at the cost of greater volatility for validators.
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/// Expressed in millionth, must be between 0 and 1_000_000.
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///
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/// - `max_piece_count`: The maximum number of pieces in the curve. A greater number uses more
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/// resources but results in higher accuracy.
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/// Must be between 2 and 1_000.
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///
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/// - `test_precision`: The maximum error allowed in the generated test.
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/// Expressed in millionth, must be between 0 and 1_000_000.
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///
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/// # Example
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///
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/// ```
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/// # fn main() {}
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/// use sp_runtime::curve::PiecewiseLinear;
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///
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/// pallet_staking_reward_curve::build! {
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/// const I_NPOS: PiecewiseLinear<'static> = curve!(
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/// min_inflation: 0_025_000,
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/// max_inflation: 0_100_000,
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/// ideal_stake: 0_500_000,
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/// falloff: 0_050_000,
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/// max_piece_count: 40,
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/// test_precision: 0_005_000,
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/// );
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/// }
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/// ```
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#[proc_macro]
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pub fn build(input: TokenStream) -> TokenStream {
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let input = syn::parse_macro_input!(input as INposInput);
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let points = compute_points(&input);
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let declaration = generate_piecewise_linear(points);
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let test_module = generate_test_module(&input);
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let imports = match crate_name("sp-runtime") {
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Ok(sp_runtime) => {
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let ident = syn::Ident::new(&sp_runtime, Span::call_site());
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quote!( extern crate #ident as _sp_runtime; )
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},
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Err(e) => syn::Error::new(Span::call_site(), &e).to_compile_error(),
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};
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let const_name = input.ident;
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let const_type = input.typ;
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quote!(
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const #const_name: #const_type = {
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#imports
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#declaration
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};
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#test_module
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).into()
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}
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const MILLION: u32 = 1_000_000;
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mod keyword {
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syn::custom_keyword!(curve);
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syn::custom_keyword!(min_inflation);
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syn::custom_keyword!(max_inflation);
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syn::custom_keyword!(ideal_stake);
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syn::custom_keyword!(falloff);
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syn::custom_keyword!(max_piece_count);
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syn::custom_keyword!(test_precision);
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}
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struct INposInput {
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ident: syn::Ident,
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typ: syn::Type,
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min_inflation: u32,
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ideal_stake: u32,
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max_inflation: u32,
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falloff: u32,
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max_piece_count: u32,
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test_precision: u32,
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}
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struct Bounds {
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min: u32,
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min_strict: bool,
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max: u32,
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max_strict: bool,
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}
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impl Bounds {
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fn check(&self, value: u32) -> bool {
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let wrong = (self.min_strict && value <= self.min)
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|| (!self.min_strict && value < self.min)
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|| (self.max_strict && value >= self.max)
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|| (!self.max_strict && value > self.max);
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!wrong
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}
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}
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impl core::fmt::Display for Bounds {
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fn fmt(&self, f: &mut core::fmt::Formatter<'_>) -> core::fmt::Result {
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write!(
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f,
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"{}{:07}; {:07}{}",
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if self.min_strict { "]" } else { "[" },
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self.min,
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self.max,
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if self.max_strict { "[" } else { "]" },
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)
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}
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}
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fn parse_field<Token: Parse + Default + ToTokens>(input: ParseStream, bounds: Bounds)
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-> syn::Result<u32>
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{
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<Token>::parse(&input)?;
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<syn::Token![:]>::parse(&input)?;
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let value_lit = syn::LitInt::parse(&input)?;
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let value: u32 = value_lit.base10_parse()?;
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if !bounds.check(value) {
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return Err(syn::Error::new(value_lit.span(), format!(
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"Invalid {}: {}, must be in {}", Token::default().to_token_stream(), value, bounds,
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)));
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}
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Ok(value)
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}
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impl Parse for INposInput {
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fn parse(input: ParseStream) -> syn::Result<Self> {
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let args_input;
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<syn::Token![const]>::parse(&input)?;
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let ident = <syn::Ident>::parse(&input)?;
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<syn::Token![:]>::parse(&input)?;
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let typ = <syn::Type>::parse(&input)?;
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<syn::Token![=]>::parse(&input)?;
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<keyword::curve>::parse(&input)?;
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<syn::Token![!]>::parse(&input)?;
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syn::parenthesized!(args_input in input);
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<syn::Token![;]>::parse(&input)?;
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if !input.is_empty() {
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return Err(input.error("expected end of input stream, no token expected"));
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}
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let min_inflation = parse_field::<keyword::min_inflation>(&args_input, Bounds {
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min: 0,
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min_strict: true,
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max: 1_000_000,
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max_strict: false,
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})?;
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<syn::Token![,]>::parse(&args_input)?;
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let max_inflation = parse_field::<keyword::max_inflation>(&args_input, Bounds {
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min: min_inflation,
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min_strict: true,
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max: 1_000_000,
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max_strict: false,
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})?;
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<syn::Token![,]>::parse(&args_input)?;
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let ideal_stake = parse_field::<keyword::ideal_stake>(&args_input, Bounds {
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min: 0_100_000,
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min_strict: false,
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max: 0_900_000,
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max_strict: false,
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})?;
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<syn::Token![,]>::parse(&args_input)?;
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let falloff = parse_field::<keyword::falloff>(&args_input, Bounds {
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min: 0_010_000,
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min_strict: false,
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max: 1_000_000,
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max_strict: false,
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})?;
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<syn::Token![,]>::parse(&args_input)?;
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let max_piece_count = parse_field::<keyword::max_piece_count>(&args_input, Bounds {
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min: 2,
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min_strict: false,
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max: 1_000,
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max_strict: false,
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})?;
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<syn::Token![,]>::parse(&args_input)?;
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let test_precision = parse_field::<keyword::test_precision>(&args_input, Bounds {
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min: 0,
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min_strict: false,
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max: 1_000_000,
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max_strict: false,
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})?;
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<Option<syn::Token![,]>>::parse(&args_input)?;
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if !args_input.is_empty() {
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return Err(args_input.error("expected end of input stream, no token expected"));
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}
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Ok(Self {
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ident,
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typ,
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min_inflation,
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ideal_stake,
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max_inflation,
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falloff,
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max_piece_count,
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test_precision,
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})
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}
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}
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struct INPoS {
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i_0: u32,
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i_ideal_times_x_ideal: u32,
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i_ideal: u32,
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x_ideal: u32,
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d: u32,
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}
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impl INPoS {
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fn from_input(input: &INposInput) -> Self {
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INPoS {
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i_0: input.min_inflation,
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i_ideal: (input.max_inflation as u64 * MILLION as u64 / input.ideal_stake as u64)
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.try_into().unwrap(),
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i_ideal_times_x_ideal: input.max_inflation,
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x_ideal: input.ideal_stake,
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d: input.falloff,
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}
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}
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// calculates x from:
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// y = i_0 + (i_ideal * x_ideal - i_0) * 2^((x_ideal - x)/d)
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// See web3 docs for the details
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fn compute_opposite_after_x_ideal(&self, y: u32) -> u32 {
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if y == self.i_0 {
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return u32::max_value();
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}
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// Note: the log term calculated here represents a per_million value
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let log = log2(self.i_ideal_times_x_ideal - self.i_0, y - self.i_0);
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let term: u32 = ((self.d as u64 * log as u64) / 1_000_000).try_into().unwrap();
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self.x_ideal + term
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}
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}
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fn compute_points(input: &INposInput) -> Vec<(u32, u32)> {
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let inpos = INPoS::from_input(input);
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let mut points = vec![];
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points.push((0, inpos.i_0));
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points.push((inpos.x_ideal, inpos.i_ideal_times_x_ideal));
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// For each point p: (next_p.0 - p.0) < segment_length && (next_p.1 - p.1) < segment_length.
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// This ensures that the total number of segment doesn't overflow max_piece_count.
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let max_length = (input.max_inflation - input.min_inflation + 1_000_000 - inpos.x_ideal)
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/ (input.max_piece_count - 1);
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let mut delta_y = max_length;
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let mut y = input.max_inflation;
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// The algorithm divide the curve in segment with vertical len and horizontal len less
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// than `max_length`. This is not very accurate in case of very consequent steep.
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while delta_y != 0 {
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let next_y = y - delta_y;
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if next_y <= input.min_inflation {
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delta_y = delta_y.saturating_sub(1);
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continue
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}
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let next_x = inpos.compute_opposite_after_x_ideal(next_y);
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if (next_x - points.last().unwrap().0) > max_length {
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delta_y = delta_y.saturating_sub(1);
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continue
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}
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if next_x >= 1_000_000 {
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let prev = points.last().unwrap();
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// Compute the y corresponding to x=1_000_000 using the this point and the previous one.
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let delta_y: u32 = (
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(next_x - 1_000_000) as u64
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* (prev.1 - next_y) as u64
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/ (next_x - prev.0) as u64
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).try_into().unwrap();
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let y = next_y + delta_y;
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points.push((1_000_000, y));
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return points;
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}
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points.push((next_x, next_y));
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y = next_y;
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}
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points.push((1_000_000, inpos.i_0));
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points
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}
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fn generate_piecewise_linear(points: Vec<(u32, u32)>) -> TokenStream2 {
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let mut points_tokens = quote!();
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let max = points.iter()
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.map(|&(_, x)| x)
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.max()
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.unwrap_or(0)
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.checked_mul(1_000)
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// clip at 1.0 for sanity only since it'll panic later if too high.
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.unwrap_or(1_000_000_000);
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for (x, y) in points {
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let error = || panic!(
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"Generated reward curve approximation doesn't fit into [0, 1] -> [0, 1] \
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because of point:
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x = {:07} per million
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y = {:07} per million",
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x, y
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);
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let x_perbill = x.checked_mul(1_000).unwrap_or_else(error);
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let y_perbill = y.checked_mul(1_000).unwrap_or_else(error);
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points_tokens.extend(quote!(
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(
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_sp_runtime::Perbill::from_parts(#x_perbill),
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_sp_runtime::Perbill::from_parts(#y_perbill),
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),
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));
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}
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quote!(
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_sp_runtime::curve::PiecewiseLinear::<'static> {
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points: & [ #points_tokens ],
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maximum: _sp_runtime::Perbill::from_parts(#max),
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}
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)
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}
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fn generate_test_module(input: &INposInput) -> TokenStream2 {
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let inpos = INPoS::from_input(input);
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let ident = &input.ident;
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let precision = input.test_precision;
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let i_0 = inpos.i_0 as f64/ MILLION as f64;
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let i_ideal_times_x_ideal = inpos.i_ideal_times_x_ideal as f64 / MILLION as f64;
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let i_ideal = inpos.i_ideal as f64 / MILLION as f64;
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let x_ideal = inpos.x_ideal as f64 / MILLION as f64;
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let d = inpos.d as f64 / MILLION as f64;
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let max_piece_count = input.max_piece_count;
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quote!(
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#[cfg(test)]
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mod __pallet_staking_reward_curve_test_module {
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fn i_npos(x: f64) -> f64 {
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if x <= #x_ideal {
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#i_0 + x * (#i_ideal - #i_0 / #x_ideal)
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} else {
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#i_0 + (#i_ideal_times_x_ideal - #i_0) * 2_f64.powf((#x_ideal - x) / #d)
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}
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}
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const MILLION: u32 = 1_000_000;
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#[test]
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fn reward_curve_precision() {
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for &base in [MILLION, u32::max_value()].iter() {
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let number_of_check = 100_000.min(base);
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for check_index in 0..=number_of_check {
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let i = (check_index as u64 * base as u64 / number_of_check as u64) as u32;
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let x = i as f64 / base as f64;
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let float_res = (i_npos(x) * base as f64).round() as u32;
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let int_res = super::#ident.calculate_for_fraction_times_denominator(i, base);
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let err = (
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(float_res.max(int_res) - float_res.min(int_res)) as u64
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* MILLION as u64
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/ float_res as u64
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) as u32;
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if err > #precision {
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panic!(format!("\n\
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Generated reward curve approximation differ from real one:\n\t\
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for i = {} and base = {}, f(i/base) * base = {},\n\t\
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but approximation = {},\n\t\
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err = {:07} millionth,\n\t\
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try increase the number of segment: {} or the test_error: {}.\n",
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i, base, float_res, int_res, err, #max_piece_count, #precision
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));
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}
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}
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}
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}
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#[test]
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fn reward_curve_piece_count() {
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assert!(
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super::#ident.points.len() as u32 - 1 <= #max_piece_count,
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"Generated reward curve approximation is invalid: \
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has more points than specified, please fill an issue."
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);
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}
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}
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).into()
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}
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