/* S: simplex B: box N: size I: index L: loop p: degree (aka order in Gmsh) 1,2,3: topological dimension i,j,k: coordinate indices */ #define SN1(p) ((p)+1) #define SN2(p) (SN1(p)*SN1((p)+1)/2) #define SN3(p) (SN2(p)*SN1((p)+2)/3) #define SI1(p, i) ((i)) #define SI2(p, i, j) ((i)+(SN2(p)-SN2((p)-(j)))) #define SI3(p, i, j, k) (SI2((p)-(k),i,j)+(SN3(p)-SN3((p)-(k)))) #define SL1(p, i) for ((i)=1;(i)<(p);++(i)) #define SL2(p, i, j) SL1((p)-1,i) SL1((p)-(i),j) #define SL3(p, i, j, k) SL1((p)-2,i) SL1((p)-(i),j) SL1((p)-(i)-(j),k) #define BN1(p) ((p)+1) #define BN2(p) (BN1(p)*BN1(p)) #define BN3(p) (BN2(p)*BN1(p)) #define BI1(p, i) ((i)) #define BI2(p, i, j) ((i)+(j)*BN1(p)) #define BI3(p, i, j, k) ((i)+BI2(p,j,k)*BN1(p)) #define BL1(p, i) for ((i)=1;(i)<(p);++(i)) #define BL2(p, i, j) BL1(p,i) BL1(p,j) #define BL3(p, i, j, k) BL1(p,i) BL1(p,j) BL1(p,k) #define GmshNumNodes_VTX(p) (1) #define GmshNumNodes_SEG(p) SN1(p) #define GmshNumNodes_TRI(p) SN2(p) #define GmshNumNodes_QUA(p) BN2(p) #define GmshNumNodes_TET(p) SN3(p) #define GmshNumNodes_HEX(p) BN3(p) #define GmshNumNodes_PRI(p) (SN2(p)*BN1(p)) #define GmshNumNodes_PYR(p) (((p)+1)*((p)+2)*(2*(p)+3)/6) #define GMSH_MAX_ORDER 10 PETSC_STATIC_INLINE int GmshLexOrder_VTX(int p, int lex[], int node) { lex[0] = node++; (void)p; return node; } PETSC_STATIC_INLINE int GmshLexOrder_SEG(int p, int lex[], int node) { #define loop1(i) SL1(p, i) #define index(i) SI1(p, i) int i; /* trivial case */ if (p == 0) lex[0] = node++; if (p == 0) return node; /* vertex nodes */ lex[index(0)] = node++; lex[index(p)] = node++; if (p == 1) return node; /* internal cell nodes */ loop1(i) lex[index(i)] = node++; return node; #undef loop1 #undef index } PETSC_STATIC_INLINE int GmshLexOrder_TRI(int p, int lex[], int node) { #define loop1(i) SL1(p, i) #define loop2(i, j) SL2(p, i, j) #define index(i, j) SI2(p, i, j) int i, j, *sub, buf[SN2(GMSH_MAX_ORDER)]; /* trivial case */ if (p == 0) lex[0] = node++; if (p == 0) return node; /* vertex nodes */ lex[index(0, 0)] = node++; lex[index(p, 0)] = node++; lex[index(0, p)] = node++; if (p == 1) return node; /* internal edge nodes */ loop1(i) lex[index(i, 0)] = node++; loop1(j) lex[index(p-j, j)] = node++; loop1(j) lex[index(0, p-j)] = node++; if (p == 2) return node; /* internal cell nodes */ node = GmshLexOrder_TRI(p-3, sub=buf, node); loop2(j, i) lex[index(i, j)] = *sub++; return node; #undef loop1 #undef loop2 #undef index } PETSC_STATIC_INLINE int GmshLexOrder_QUA(int p, int lex[], int node) { #define loop1(i) BL1(p, i) #define loop2(i, j) BL2(p, i, j) #define index(i, j) BI2(p, i, j) int i, j, *sub, buf[BN2(GMSH_MAX_ORDER)]; /* trivial case */ if (p == 0) lex[0] = node++; if (p == 0) return node; /* vertex nodes */ lex[index(0, 0)] = node++; lex[index(p, 0)] = node++; lex[index(p, p)] = node++; lex[index(0, p)] = node++; if (p == 1) return node; /* internal edge nodes */ loop1(i) lex[index(i, 0)] = node++; loop1(j) lex[index(p, j)] = node++; loop1(i) lex[index(p-i, p)] = node++; loop1(j) lex[index(0, p-j)] = node++; /* internal cell nodes */ node = GmshLexOrder_QUA(p-2, sub=buf, node); loop2(j, i) lex[index(i, j)] = *sub++; return node; #undef loop1 #undef loop2 #undef index } PETSC_STATIC_INLINE int GmshLexOrder_TET(int p, int lex[], int node) { #define loop1(i) SL1(p, i) #define loop2(i, j) SL2(p, i, j) #define loop3(i, j, k) SL3(p, i, j, k) #define index(i, j, k) SI3(p, i, j, k) int i, j, k, *sub, buf[SN3(GMSH_MAX_ORDER)]; /* trivial case */ if (p == 0) lex[0] = node++; if (p == 0) return node; /* vertex nodes */ lex[index(0, 0, 0)] = node++; lex[index(p, 0, 0)] = node++; lex[index(0, p, 0)] = node++; lex[index(0, 0, p)] = node++; if (p == 1) return node; /* internal edge nodes */ loop1(i) lex[index(i, 0, 0)] = node++; loop1(j) lex[index(p-j, j, 0)] = node++; loop1(j) lex[index(0, p-j, 0)] = node++; loop1(k) lex[index(0, 0, p-k)] = node++; loop1(j) lex[index(0, j, p-j)] = node++; loop1(i) lex[index(i, 0, p-i)] = node++; if (p == 2) return node; /* internal face nodes */ node = GmshLexOrder_TRI(p-3, sub=buf, node); loop2(i, j) lex[index(i, j, 0)] = *sub++; node = GmshLexOrder_TRI(p-3, sub=buf, node); loop2(k, i) lex[index(i, 0, k)] = *sub++; node = GmshLexOrder_TRI(p-3, sub=buf, node); loop2(j, k) lex[index(0, j, k)] = *sub++; node = GmshLexOrder_TRI(p-3, sub=buf, node); loop2(j, i) lex[index(i, j, p-i-j)] = *sub++; if (p == 3) return node; /* internal cell nodes */ node = GmshLexOrder_TET(p-4, sub=buf, node); loop3(k, j, i) lex[index(i, j, k)] = *sub++; return node; #undef loop1 #undef loop2 #undef loop3 #undef index } PETSC_STATIC_INLINE int GmshLexOrder_HEX(int p, int lex[], int node) { #define loop1(i) BL1(p, i) #define loop2(i, j) BL2(p, i, j) #define loop3(i, j, k) BL3(p, i, j, k) #define index(i, j, k) BI3(p, i, j, k) int i, j, k, *sub, buf[BN3(GMSH_MAX_ORDER)]; /* trivial case */ if (p == 0) lex[0] = node++; if (p == 0) return node; /* vertex nodes */ lex[index(0, 0, 0)] = node++; lex[index(p, 0, 0)] = node++; lex[index(p, p, 0)] = node++; lex[index(0, p, 0)] = node++; lex[index(0, 0, p)] = node++; lex[index(p, 0, p)] = node++; lex[index(p, p, p)] = node++; lex[index(0, p, p)] = node++; if (p == 1) return node; /* internal edge nodes */ loop1(i) lex[index(i, 0, 0)] = node++; loop1(j) lex[index(0, j, 0)] = node++; loop1(k) lex[index(0, 0, k)] = node++; loop1(j) lex[index(p, j, 0)] = node++; loop1(k) lex[index(p, 0, k)] = node++; loop1(i) lex[index(p-i, p, 0)] = node++; loop1(k) lex[index(p, p, k)] = node++; loop1(k) lex[index(0, p, k)] = node++; loop1(i) lex[index(i, 0, p)] = node++; loop1(j) lex[index(0, j, p)] = node++; loop1(j) lex[index(p, j, p)] = node++; loop1(i) lex[index(p-i, p, p)] = node++; /* internal face nodes */ node = GmshLexOrder_QUA(p-2, sub=buf, node); loop2(i, j) lex[index(i, j, 0)] = *sub++; node = GmshLexOrder_QUA(p-2, sub=buf, node); loop2(k, i) lex[index(i, 0, k)] = *sub++; node = GmshLexOrder_QUA(p-2, sub=buf, node); loop2(j, k) lex[index(0, j, k)] = *sub++; node = GmshLexOrder_QUA(p-2, sub=buf, node); loop2(k, j) lex[index(p, j, k)] = *sub++; node = GmshLexOrder_QUA(p-2, sub=buf, node); loop2(k, i) lex[index(p-i, p, k)] = *sub++; node = GmshLexOrder_QUA(p-2, sub=buf, node); loop2(j, i) lex[index(i, j, p)] = *sub++; /* internal cell nodes */ node = GmshLexOrder_HEX(p-2, sub=buf, node); loop3(k, j, i) lex[index(i, j, k)] = *sub++; return node; #undef loop1 #undef loop2 #undef loop3 #undef index } PETSC_STATIC_INLINE int GmshLexOrder_PRI(int p, int lex[], int node) { #define loop1(i) BL1(p, i) #define loops(i, j) SL2(p, i, j) #define loopb(i, j) BL2(p, i, j) #define index(i, j, k) (SI2(p,i,j)+BI1(p,k)*SN2(p)) int i, j, k, *sub, buf[BN2(GMSH_MAX_ORDER)]; /* trivial case */ if (p == 0) lex[0] = node++; if (p == 0) return node; /* vertex nodes */ lex[index(0, 0, 0)] = node++; lex[index(p, 0, 0)] = node++; lex[index(0, p, 0)] = node++; lex[index(0, 0, p)] = node++; lex[index(p, 0, p)] = node++; lex[index(0, p, p)] = node++; if (p == 1) return node; /* internal edge nodes */ loop1(i) lex[index(i, 0, 0)] = node++; loop1(j) lex[index(0, j, 0)] = node++; loop1(k) lex[index(0, 0, k)] = node++; loop1(j) lex[index(p-j, j, 0)] = node++; loop1(k) lex[index(p, 0, k)] = node++; loop1(k) lex[index(0, p, k)] = node++; loop1(i) lex[index(i, 0, p)] = node++; loop1(j) lex[index(0, j, p)] = node++; loop1(j) lex[index(p-j, j, p)] = node++; if (p >= 3) { /* internal bottom face nodes */ node = GmshLexOrder_TRI(p-3, sub=buf, node); loops(i, j) lex[index(i, j, 0)] = *sub++; /* internal top face nodes */ node = GmshLexOrder_TRI(p-3, sub=buf, node); loops(j, i) lex[index(i, j, p)] = *sub++; } if (p >= 2) { /* internal front face nodes */ node = GmshLexOrder_QUA(p-2, sub=buf, node); loopb(k, i) lex[index(i, 0, k)] = *sub++; /* internal left face nodes */ node = GmshLexOrder_QUA(p-2, sub=buf, node); loopb(j, k) lex[index(0, j, k)] = *sub++; /* internal back face nodes */ node = GmshLexOrder_QUA(p-2, sub=buf, node); loopb(k, j) lex[index(p-j, j, k)] = *sub++; } if (p >= 3) { /* internal cell nodes */ typedef struct {int i,j;} pair; pair ij[SN2(GMSH_MAX_ORDER)], tmp[SN2(GMSH_MAX_ORDER)]; int m = GmshLexOrder_TRI(p-3, sub=buf, 0), l = 0; loops(j, i) {tmp[l].i = i; tmp[l].j = j; l++;} for (l=0; l