Delphi-PRAXiS - Einzelnen Beitrag anzeigen

**EgonHugeist**

Delphi-Quellcode:

			//v. 2012-05-16

//free for any use

unit ShaRadixSorts;

interface

type

  TShaRadixKey= function(Item: pointer): integer;

//Examples:

//to descending sort by integer field: ShaRadixSort(List, Count, ShaRadixKeyIntegerDesc);

//to ascending sort by int64 field: ShaRadixSort(List, Count, ShaRadixKeyCardinal, ShaRadixKeyInt64High);

procedure ShaRadixSort(List: pointer; Count: integer; RadixKey: TShaRadixKey; RadixKeyHigh: TShaRadixKey= nil);

function ShaRadixKeyInteger(Item: pointer): integer;

function ShaRadixKeyCardinal(Item: pointer): integer;

function ShaRadixKeyInt64High(Item: pointer): integer;

function ShaRadixKeyIntegerDesc(Item: pointer): integer;

function ShaRadixKeyCardinalDesc(Item: pointer): integer;

function ShaRadixKeyInt64HighDesc(Item: pointer): integer;

implementation

//ascending order, signed integers

function ShaRadixKeyInteger(Item: pointer): integer;

begin;

  Result:=Cardinal(Item^) xor $80000000;

  end;

//ascending order, unsigned integers or low part of int64

function ShaRadixKeyCardinal(Item: pointer): integer;

begin;

  Result:=Cardinal(Item^);

  end;

//ascending order, high (signed) part of int64

function ShaRadixKeyInt64High(Item: pointer): integer;

type

  PCardinalArray= ^TCardinalArray;

  TCardinalArray= array[0..1] of cardinal;

begin;

  Result:=PCardinalArray(Item)[1] xor $80000000;

  end;

//descending order, signed integers

function ShaRadixKeyIntegerDesc(Item: pointer): integer;

begin;

  Result:=Cardinal(Item^) xor $7FFFFFFF;

  end;

//descending order, unsigned integers or low part of int64

function ShaRadixKeyCardinalDesc(Item: pointer): integer;

begin;

  Result:=Cardinal(Item^) xor $FFFFFFFF;;

  end;

//descending order, high (signed) part of int64

function ShaRadixKeyInt64HighDesc(Item: pointer): integer;

type

  PCardinalArray= ^TCardinalArray;

  TCardinalArray= array[0..1] of cardinal;

begin;

  Result:=PCardinalArray(Item)[1] xor $7FFFFFFF;

  end;

function Phase0(List, Temp, Cur: pointer; RadixKey: TShaRadixKey): integer;

const

  Skip: array[0..15] of integer= (0, 0, 0, 3, 0, 0, 6, 3, 0, 0, 0, 3, 12, 12, 12, 15);

var

  i, j, k, Zeros: integer;

begin;

  k:=0;

  for j:=-1024 to -1 do pIntegerArray(Temp)[j]:=k;

  repeat;

    dec(pPointer(Cur));

    j:=RadixKey(pPointer(Cur)^);

    inc(pIntegerArray(Temp)[j and 255 - 1024]);

    inc(pIntegerArray(Temp)[j shr 8 and 255 - 768]);

    inc(pIntegerArray(Temp)[j shr 16 and 255 - 512]);

    inc(pIntegerArray(Temp)[j shr 24 - 256]);

    until Cur=List;

  j:=-1024; k:=-1; Zeros:=0;

  repeat;

    if j and 255=0 then begin;

      k:=-1; Zeros:=Zeros shl 8;

      end;

    i:=pIntegerArray(Temp)[j];

    if i=0 then inc(Zeros);

    inc(k,i);

    pIntegerArray(Temp)[j]:=k;

    inc(j);

    until j=0;

  k:=0; Zeros:=Zeros xor -1;

  for j:=1 to 4 do begin;

    k:=k+k;

    if Zeros and $FF=0 then inc(k);

    Zeros:=Zeros shr 8;

    end;

  Result:=Skip[k];

  end;

procedure Phase1(List, Temp, Cur: pointer; RadixKey: TShaRadixKey);

var

  j, k: integer;

begin;

  repeat;

    dec(pPointer(Cur));

    j:=RadixKey(pPointer(Cur)^) and 255;

    k:=pIntegerArray(Temp)[j-1024];

    pPointerArray(Temp)[k]:=pPointer(Cur)^;

    pIntegerArray(Temp)[j-1024]:=k-1;

    until Cur=List;

  end;

procedure Phase2(List, Temp, Cur: pointer; RadixKey: TShaRadixKey);

var

  j, k: integer;

begin;

  repeat;

    dec(pPointer(Cur));

    j:=RadixKey(pPointer(Cur)^) shr 8 and 255;

    k:=pIntegerArray(Temp)[j-768];

    pPointerArray(List)[k]:=pPointer(Cur)^;

    pIntegerArray(Temp)[j-768]:=k-1;

    until Cur=Temp;

  end;

procedure Phase3(List, Temp, Cur: pointer; RadixKey: TShaRadixKey);

var

  j, k: integer;

begin;

  repeat;

    dec(pPointer(Cur));

    j:=RadixKey(pPointer(Cur)^) shr 16 and 255;

    k:=pIntegerArray(Temp)[j-512];

    pPointerArray(Temp)[k]:=pPointer(Cur)^;

    pIntegerArray(Temp)[j-512]:=k-1;

    until Cur=List;

  end;

procedure Phase4(List, Temp, Cur: pointer; RadixKey: TShaRadixKey);

var

  j, k: integer;

begin;

  repeat;

    dec(pPointer(Cur));

    j:=RadixKey(pPointer(Cur)^) shr 24;

    k:=pIntegerArray(Temp)[j-256];

    pPointerArray(List)[k]:=pPointer(Cur)^;

    pIntegerArray(Temp)[j-256]:=k-1;

    until Cur=Temp;

  end;

procedure ShaRadixSort(List: pointer; Count: integer; RadixKey: TShaRadixKey; RadixKeyHigh: TShaRadixKey= nil);

var

  Temp: array of pointer;

  Skip: integer;

begin;

  if Count<=0 then exit;

  SetLength(Temp, Count+1024);

  repeat;

    Skip:=Phase0(List, @Temp[1024], @pPointerArray(List)[Count], RadixKey);

    if Skip and 1=0 then Phase1(List, @Temp[1024], @pPointerArray(List)[Count], RadixKey);

    if Skip and 2=0 then Phase2(List, @Temp[1024], @Temp[Count+1024], RadixKey);

    if Skip and 4=0 then Phase3(List, @Temp[1024], @pPointerArray(List)[Count], RadixKey);

    if Skip and 8=0 then Phase4(List, @Temp[1024], @Temp[Count+1024], RadixKey);

    RadixKey:=RadixKeyHigh;

    RadixKeyHigh:=nil;

    until not Assigned(RadixKey);

  end;

end.

Das wäre mal eine sehr schnelle Radix Interpretation von Alexandr Sharahov. QuickSort is da echt langsam dagegen. Muß dir eigentlich nur noch deinen eigen Key basteln..

Einzelnen Beitrag anzeigen

AW: Doppel schnell aus Lise löschen.