/**
 * Typed array based Disjoint Set implementation with quick union and path
 * compression, after Sedgewick & Wayne.
 *
 * @remarks
 * References:
 *
 * - https://en.wikipedia.org/wiki/Disjoint-set_data_structure
 * - https://algs4.cs.princeton.edu/lectures/15UnionFind-2x2.pdf
 */
export declare class DisjointSet {
    roots: Uint32Array;
    ranks: Uint8Array;
    count: number;
    /**
     * Creates new instance with `n` initial singular subsets.
     *
     * @param n - initial capacity, ID range `[0,n)`
     */
    constructor(n: number);
    /**
     * Returns canonical ID (tree root) for given `id`. Unless `id`
     * already is unified with some other ID, this will always return
     * `id` itself (since each node is initially its own root).
     *
     * @param id - node ID
     */
    canonical(id: number): number;
    /**
     * Connects combines the trees of the given two node IDs and returns
     * the new resulting canonical tree root ID.
     *
     * @param a - node ID
     * @param b - node ID
     */
    union(a: number, b: number): number;
    /**
     * Returns true, if the given two nodes belong to the same tree /
     * subset.
     *
     * @param a - node ID
     * @param b - node ID
     */
    unified(a: number, b: number): boolean;
    /**
     * Returns a `Map` of all subsets (connected components) with their
     * canonical tree root IDs as keys and arrays of node IDs as values.
     *
     * @remarks
     * If only the number of subsets is required, use the `count`
     * property of this class instance instead (O(1), updated with each
     * call to {@link DisjointSet.union}).
     */
    subsets(): Map<number, number[]>;
}
/**
 * Creates a new {@link DisjointSet} with capacity `n`.
 *
 * @param n -
 */
export declare const defDisjointSet: (n: number) => DisjointSet;
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