ソースコード

#include <bits/stdc++.h>
using namespace std;

const int64_t MOD = 998244353;
const int64_t ROOT = 3;
// MOD-1が何回2で割れるか
const int MX_PW = 23;
void add(int64_t& a, int64_t b){
    a = (a+b) % MOD;
}
void mul(int64_t& a, int64_t b){
    a = a*b % MOD;
}

int64_t power_mod(int64_t num, int64_t power){
    int64_t prod = 1;
    num %= MOD;
    while(power > 0){
        if(power&1) prod = prod * num % MOD;
        num = num * num % MOD;
        power >>= 1;
    }
    return prod;
}

int64_t extgcd(int64_t a, int64_t b, int64_t& x, int64_t& y){
    int64_t d = a;
    if(b != 0){
        d = extgcd(b, a%b, y, x);
        y -= (a/b) * x;
    }else{
        x = 1; y = 0;
    }
    return d;
}

int64_t inv_mod(int64_t a){
    int64_t x, y;
    extgcd(a, MOD, x, y);
    return (MOD + x%MOD) % MOD;
}

vector<int64_t> fact, fact_inv;

void create_mod_tables(int num){
    fact.assign(num+1, 1);
    fact_inv.assign(num+1, 1);
    for(int i=1; i<=num; i++) fact[i] = fact[i-1] * i % MOD;
    fact_inv[num] = inv_mod(fact[num]);
    for(int i=num; i>0; i--) fact_inv[i-1] = fact_inv[i] * i % MOD;
}

int64_t comb_mod(int n, int k){
    return fact[n] * fact_inv[n-k] % MOD * fact_inv[k] % MOD;
}

int64_t perm_mod(int n, int k){
    return fact[n] * fact_inv[n-k] % MOD;
}

vector<int64_t> zeta, zeta_inv;

void prepare_ntt(){
    zeta.resize(MX_PW);
    zeta_inv.resize(MX_PW);
    zeta[MX_PW-1] = power_mod(ROOT, (MOD-1)/(1<<MX_PW));
    zeta_inv[MX_PW-1] = inv_mod(zeta[MX_PW-1]);
    for(int k=MX_PW-2; k>=0; k--){
        zeta[k] = zeta[k+1] * zeta[k+1] % MOD;
        zeta_inv[k] = zeta_inv[k+1] * zeta_inv[k+1] % MOD;
    }
}

void dft(vector<int64_t>& f, int n, bool inverse){
    if(n==1) return;
    int c = 0;
    for(int i=1; i<n; i++){
        for(int j=(n>>1); j>(c^=j); j>>=1);
        if(c > i){
            swap(f[c], f[i]);
        }
    }

    for(int i=1, k=0; i<n; i<<=1, k++){
        int64_t w = (inverse ? zeta_inv[k] : zeta[k]);
        for(int j=0; j<n; j+=2*i){
            int64_t wn = 1;
            for(int k=0; k<i; k++){
                int64_t u = f[k+j];
                int64_t v = f[k+j+i] * wn % MOD;
                f[k+j] = (u+v) % MOD;
                f[k+j+i] = (u-v+MOD) % MOD;
                wn = wn * w % MOD;
            }
        }
    }
}
 
vector<int64_t> convolution(vector<int64_t> f, vector<int64_t> g, bool truncate=true){
    if(zeta.size() == 0) prepare_ntt();
    int sz = f.size() + g.size();
    int n = 1;
    while(n <= sz) n <<= 1;
	f.resize(n);
	g.resize(n);
    dft(f, n, false);
    dft(g, n, false);
 
    vector<int64_t> h(n);
    for(int i=0; i<n; i++) h[i] = f[i] * g[i] % MOD;
    dft(h, n, true);
    int64_t ninv = inv_mod(n);
    for(int64_t& a : h) mul(a, ninv);

    if(truncate) while(h.size() && h.back() == 0) h.pop_back();
    return h;
}

int main(){
    int N, A, B;
    create_mod_tables(300000);
    cin >> N >> A >> B;
    if(A > B) swap(A, B);
    int64_t x = A, y = B-A, z = N-B;

    int64_t ans1 = (x*x + y*y + z*z) % MOD * fact[N-1] % MOD;

    vector<int64_t> V1(x), V2(z);
    for(int i=0; i<x; i++) V1[i] = fact_inv[i] * fact_inv[x-i-1] % MOD;
    for(int i=0; i<z; i++) V2[i] = fact_inv[i] * fact_inv[z-i-1] % MOD;
    auto conv = convolution(V1, V2);
    int64_t ans2 = 0;
    for(int i=0; i<int(conv.size()); i++) add(ans2, conv[i] * fact[i] % MOD * fact[N-i-2]);
    mul(ans2, 2*fact[x]*fact[z]%MOD);

    int64_t ans = (ans1 + ans2) % MOD;
    cout << ans << endl;
    return 0;
}