X-Git-Url: https://git.sesse.net/?p=stockfish;a=blobdiff_plain;f=src%2Fmaterial.cpp;h=b9b4bb63988ec28f6425592b937d8118b6ce2205;hp=22953cff6d8d4328706cb1ffe4299d46214d2c05;hb=52ae0efccffcce7f095cc4bae7bf90fe7a3b467b;hpb=4ede49cd850392f28bc9da9537c111d2c3f0b297 diff --git a/src/material.cpp b/src/material.cpp index 22953cff..b9b4bb63 100644 --- a/src/material.cpp +++ b/src/material.cpp @@ -35,31 +35,30 @@ namespace { const int NoPawnsSF[4] = { 6, 12, 32 }; // Polynomial material balance parameters - const Value RedundantQueen = Value(320); - const Value RedundantRook = Value(554); + const Value RedundantMajor = Value(160); // pair pawn knight bishop rook queen - const int LinearCoefficients[6] = { 1617, -162, -1172, -190, 105, 26 }; + const int LinearCoefficients[6] = { 1852, -162, -1122, -183, 302, 1 }; const int QuadraticCoefficientsSameColor[][PIECE_TYPE_NB] = { // pair pawn knight bishop rook queen - { 7 }, // Bishop pair + { 0 }, // Bishop pair { 39, 2 }, // Pawn { 35, 271, -4 }, // Knight - { 7, 105, 4, 7 }, // Bishop - { -27, -2, 46, 100, 56 }, // Rook - { 58, 29, 83, 148, -3, -25 } // Queen + { 0, 105, 4, 0 }, // Bishop + { -27, -2, 46, 100, -141 }, // Rook + { 58, 29, 83, 148, -163, 0 } // Queen }; const int QuadraticCoefficientsOppositeColor[][PIECE_TYPE_NB] = { // THEIR PIECES // pair pawn knight bishop rook queen - { 41 }, // Bishop pair - { 37, 41 }, // Pawn - { 10, 62, 41 }, // Knight OUR PIECES - { 57, 64, 39, 41 }, // Bishop - { 50, 40, 23, -22, 41 }, // Rook - { 106, 101, 3, 151, 171, 41 } // Queen + { 0 }, // Bishop pair + { 37, 0 }, // Pawn + { 10, 62, 0 }, // Knight OUR PIECES + { 57, 64, 39, 0 }, // Bishop + { 50, 40, 23, -22, 0 }, // Rook + { 106, 101, 3, 151, 171, 0 } // Queen }; // Endgame evaluation and scaling functions accessed direcly and not through @@ -106,14 +105,12 @@ namespace { int pt1, pt2, pc, v; int value = 0; - // Redundancy of major pieces, formula based on Kaufman's paper - // "The Evaluation of Material Imbalances in Chess" - if (pieceCount[Us][ROOK] > 0) - value -= RedundantRook * (pieceCount[Us][ROOK] - 1) - + RedundantQueen * pieceCount[Us][QUEEN]; + // Penalty for major piece redundancy + if (pieceCount[Us][ROOK] + pieceCount[Us][QUEEN] > 1) + value -= RedundantMajor; // Second-degree polynomial material imbalance by Tord Romstad - for (pt1 = NO_PIECE_TYPE; pt1 <= QUEEN; pt1++) + for (pt1 = NO_PIECE_TYPE; pt1 <= QUEEN; ++pt1) { pc = pieceCount[Us][pt1]; if (!pc) @@ -121,7 +118,7 @@ namespace { v = LinearCoefficients[pt1]; - for (pt2 = NO_PIECE_TYPE; pt2 <= pt1; pt2++) + for (pt2 = NO_PIECE_TYPE; pt2 <= pt1; ++pt2) v += QuadraticCoefficientsSameColor[pt1][pt2] * pieceCount[Us][pt2] + QuadraticCoefficientsOppositeColor[pt1][pt2] * pieceCount[Them][pt2]; @@ -240,7 +237,8 @@ Entry* probe(const Position& pos, Table& entries, Endgames& endgames) { } } - // No pawns makes it difficult to win, even with a material advantage + // No pawns makes it difficult to win, even with a material advantage. This + // catches some trivial draws like KK, KBK and KNK if (!pos.count(WHITE) && npm_w - npm_b <= BishopValueMg) { e->factor[WHITE] = (uint8_t) @@ -259,7 +257,7 @@ Entry* probe(const Position& pos, Table& entries, Endgames& endgames) { int minorPieceCount = pos.count(WHITE) + pos.count(WHITE) + pos.count(BLACK) + pos.count(BLACK); - e->spaceWeight = minorPieceCount * minorPieceCount; + e->spaceWeight = make_score(minorPieceCount * minorPieceCount, 0); } // Evaluate the material imbalance. We use PIECE_TYPE_NONE as a place holder