Given A and B

```
A={{'a','b'},{'c'},{'d','e'}}
B={{'a','b'},{'c','d'},{'e'}}
```

We can define a function `isSubset`

, as follows:

```
isSubset = @(superSet,subSet)isempty(setdiff(subSet, superSet));
```

And test it:

```
isSubset(B{1}, A{1}) %true
isSubset(B{2}, A{2}) %true
isSubset(B{3}, A{3}) %false
```

Now we can use `isSubSet`

and `cellfun`

to define a function `isSubSetOfAny`

, which checks to see if a particular subset is a subset of any of a set of sets, like this:

```
isSubSetOfAny = @(superSetSet, subSet) any(cellfun(@(x)isSubset(x, subSet), superSetSet));
```

And test it:

```
isSubSetOfAny(B, A{1}) %True
isSubSetOfAny(B, A{2}) %True
isSubSetOfAny(B, A{3}) %True
```

Now we can use `isSubSetOfAny`

plus `cellfun`

(again) to define `isEachMemberASubsetOfAny`

, which performs the operation you describe:

```
isEachMemberASubsetOfAny = @(superSetSet, subSetSet) all(cellfun(@(x)isSubSetOfAny(superSetSet, x), subSetSet));
```

And test it:

```
isEachMemberASubsetOfAny(B, A) %Returns false
A_1 = {{'a','b'},{'c'},{'e'}}; %Define a variant of `A`
isEachMemberASubsetOfAny(B, A_1) %Returns false
```