package org.wsc.coding.basic.array;
public class ArrayUtil {
/**
* 给定一个整形数组a , 对该数组的值进行置换 例如: a = [7, 9 , 30, 3] , 置换后为 [3, 30, 9,7] 如果 a =
* [7, 9, 30, 3, 4] , 置换后为 [4,3, 30 , 9,7]
*
* @param origin
* @return
*/
public static void reverseArray(int[] origin) {
// 折半
for (int i = 0; i < (origin.length >> 1); i++) {
int num = origin[i];
origin[i] = origin[origin.length - 1 - i];
origin[origin.length - 1 - i] = num;
}
}
/**
* 现在有如下的一个数组: int oldArr[]={1,3,4,5,0,0,6,6,0,5,4,7,6,7,0,5}
* 要求将以上数组中值为0的项去掉,将不为0的值存入一个新的数组,生成的新数组为: {1,3,4,5,6,6,5,4,7,6,7,5}
*
* @param oldArray
* @return
*/
public static int[] removeZero(int[] oldArray) {
int count = 0;// 计数器
/*
* 利用冒泡,将0元素向后排 {1,3,4,5,0,0,6,6,0,5,4,7,6,7,0,5}
* {1,3,4,5,0,6,6,0,5,4,7,6,7,0,5,0} {1,3,4,5,6,6,0,5,4,7,6,7,0,5,0,0}
* ....
*/
for (int i = 0; i < oldArray.length - count; i++) {
// 索引为i的元素为0,则依次将索引i的元素与i+1的元素对换
if (oldArray[i] == 0) {
for (int j = i; j < oldArray.length - 1 - count; j++) {
int num = oldArray[j];
oldArray[j] = oldArray[j + 1];
oldArray[j + 1] = num;
}
count++;// 计数器+1
i--;// 防止原索引i+1位置的元素为0,
}
}
// 创建新数组
int[] newArray = new int[oldArray.length - count];
System.arraycopy(oldArray, 0, newArray, 0, newArray.length);
return newArray;
}
/**
* 现在有如下的一个数组: int oldArr[]={1,3,4,5,0,0,6,6,0,5,4,7,6,7,0,5}
* 要求将以上数组中值为0的项去掉,将不为0的值存入一个新的数组,生成的新数组为: {1,3,4,5,6,6,5,4,7,6,7,5}
*
* @param oldArray
* @return
*/
public static int[] removeZero2(int[] oldArray) {
int count = 0;// 计数器
for (int i = 0; i < oldArray.length; i++) {
if (oldArray[i] == 0)
count++;// 计数器+1
}
// 创建新数组
int[] newArray = new int[oldArray.length - count];
for (int i = 0, j = 0; i < oldArray.length; i++) {
if (oldArray[i] != 0) {
newArray[j] = oldArray[i];
j++;
}
}
return newArray;
}
/**
* 给定两个已经排序好的整形数组, a1和a2 , 创建一个新的数组a3, 使得a3 包含a1和a2 的所有元素, 并且仍然是有序的 例如 a1 =
* [3, 5, 7,8] a2 = [4, 5, 6,7] 则 a3 为[3,4,5,6,7,8] , 注意: 已经消除了重复
*
* @param array1
* @param array2
* @return
*/
public static int[] merge(int[] array1, int[] array2) {
int[] newArray = new int[array1.length + array2.length];
int i = 0, j = 0, k = 0;
while (i < array1.length && j < array2.length) {
// <= 都取 array1
if (array1[i] <= array2[j]) {
// 等于时,将array2下标++
if (array1[i] == array2[j])
j++;
newArray[k++] = array1[i++];
} else
newArray[k++] = array2[j++];
}
// 将没有循环完毕的元素插入
while (i < array1.length)
newArray[k++] = array1[i++];
while (j < array2.length)
newArray[k++] = array2[j++];
int[] result = newArray;
// 长度缩短则新建数组
if (k < newArray.length) {
result = new int[k];
for (int l = 0; l < result.length; l++)
result[l] = newArray[l];
}
return result;
}
/**
* 把一个已经存满数据的数组 oldArray的容量进行扩展, 扩展后的新数据大小为oldArray.length + size
* 注意,老数组的元素在新数组中需要保持 例如 oldArray = [2,3,6] , size = 3,则返回的新数组为
* [2,3,6,0,0,0]
*
* @param oldArray
* @param size
* @return
*/
public static int[] grow(int[] oldArray, int size) {
int[] newArray = new int[oldArray.length + size];
for (int i = 0; i < oldArray.length; i++) {
newArray[i] = oldArray[i];
}
return newArray;
}
/**
* 斐波那契数列为:1,1,2,3,5,8,13,21...... ,给定一个最大值, 返回小于该值的数列 例如, max = 15 ,
* 则返回的数组应该为 [1,1,2,3,5,8,13] max = 1, 则返回空数组 []
*
* @param max
* @return
*/
public static int[] fibonacci(int max) {
if (max <= 1)
return new int[] {};
int[] nums = new int[max];
nums[0] = nums[1] = 1;
int flag;
for (flag = 0; (flag < max - 2 && nums[flag] + nums[flag + 1] < max); flag++) {
nums[flag + 2] = nums[flag] + nums[flag + 1];
}
// 创建新数组
int[] newArray = nums;
if (newArray.length != flag + 2) {
newArray = new int[flag + 2];
for (int i = 0; i < newArray.length; i++) {
newArray[i] = nums[i];
}
}
return newArray;
}
/**
* 返回小于给定最大值max的所有素数数组 例如max = 23, 返回的数组为[2,3,5,7,11,13,17,19]
*
* @param max
* @return
*/
public static int[] getPrimes(int max) {
int[] array = new int[max>>1];
int flag = 0;
for (int i = 2; i < max; i++) {
int j;
for (j = 2; j <= (i >> 1); j++) {
if (i % j == 0)
break;
}
//如果大于,则证明j++有运行,已经完整对比
if(j > i>>1)
array[flag++] = i;
}
int[] newArray = array;
if(flag < array.length){
newArray = new int[flag];
for (int i = 0; i < newArray.length; i++) {
newArray[i] = array[i];
}
}
return newArray;
}
/**
* 所谓“完数”, 是指这个数恰好等于它的因子之和,例如6=1+2+3 给定一个最大值max, 返回一个数组, 数组中是小于max 的所有完数
*
* @param max
* @return
*/
public static int[] getPerfectNumbers(int max) {
int[] array = new int[max];
int flag = 0;
for (int i = 1; i < max; i++) {
int sum = 0;
for (int j = 1; j < i; j++) {
if (i % j == 0)
sum+=j;
}
//如果大于,则证明j++有运行,已经完整对比
if(sum == i)
array[flag++] = i;
}
int[] newArray = array;
if(flag < array.length){
newArray = new int[flag];
for (int i = 0; i < newArray.length; i++) {
newArray[i] = array[i];
}
}
return newArray;
}
/**
* 用seperator 把数组 array给连接起来 例如array= [3,8,9], seperator = "-" 则返回值为"3-8-9"
*
* @param array
* @param s
* @return
*/
public static String join(int[] array, String seperator) {
String str = "";
for (int i = 0; i < array.length; i++)
str += i != array.length - 1 ? array[i] + seperator : array[i];
return str;
}
}